Unsolvable tension force problem

This was a problem on an exam that our professor later discovered was unsolvable THE WAY HE POSED THE QUESTION. First off, it's important to note that this is from a statics class, therefore Fnet = 0 will be true for all problems in our course.

So here's my thoughts on this and I would like to see if anyone else agrees with me or if I'm just completely way off.

If rope EAD has a tension force of 980N, the so should the AD segment of that rope. The z component of AD should have a F = 980cos(1/sqrt(8)) in the positive z direction. Since there are no other forces with components in either z direction, it would imply that the arrangement has not settled and will move. which would imply that Fnet does not = 0. Also I understand that the center ring can act as a pulley (which in this problem has no mass or friction), however it is not a fixed pulley. So wouldn't the Fnet for each component (x,y,z) have to equal 0 individually?

I'm confused when you say "act as a pulley" but if we can ignore this and just go back to your original statement about the z component. If Fnet=0 then the z component has to equal the force in AE doesn't it?

If you consider pulley systems in physics that we examine to be massless and frictionless then it wouldn't matter if the pulley rotated or not. The function of the pulley is to redirect the rope and thus redirecting the tension force. This basically does the same thing, doesn't it? The only difference is that instead of the "pulley" being fixed on a wedge or table, the "pulley" is free floating. I guess the main thing that has me confused is do the components each individually need to equal zero? Or is it possible for them to have some magnitude but the net force still equals zero?

Thats part of the problem though. Yes, the -z component would be EA, but remember that EA is part of the whole rope EAD. If this system were at equilibrium and Fnet = 0, then there should be another +z component of equal magnitude, or a combination of +z components. The section AD would have some +z force component to it, but it couldn't possibly be enough if EAD were all the same force. But if the components of Fnet do not need to equal 0 individually then that doesn't matter, right?

Ok, so then this problem is unsolvable the way it is asked because it is not possible for there to be enough of an opposing force in the +z direction for the system to have an Fnet of 0? Does that sound right?

Ok, so then this problem is unsolvable the way it is asked because it is not possible for there to be enough of an opposing force in the +z direction for the system to have an Fnet of 0? Does that sound right?